Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

So I thought that negative numbers, when mod'ed should be put into positive space... I cant get this to happen in objective-c

I expect this:

-1 % 3 = 2
 0 % 3 = 0
 1 % 3 = 1
 2 % 3 = 2

But get this

-1 % 3 = -1
 0 % 3 = 0
 1 % 3 = 1
 2 % 3 = 2

Why is this and is there a workaround?

share|improve this question
Clojure is the first language I've come across that implements mod correctly. Yay! –  Todd Owen Oct 26 '11 at 15:59
@ToddOwen: Python does it properly as well –  Claudiu Aug 30 '13 at 16:23
@Todd, Lisp has both. –  Pacerier Sep 10 at 9:57

10 Answers 10

up vote 42 down vote accepted
result = n % 3;
if( result < 0 ) result += 3;

Don't perform extra mod operations as suggested in the other answers. They are very expensive and unnecessary.

share|improve this answer
Doesn't it depend on the processor whether conditionals are better or worse than a modulo? –  Nosredna Jun 13 '09 at 5:03
I've never seen a processor where division or modulo isn't the slowest operation. Checking for negative reduces to testing the value of a bit, so is usually one of the fastest instructions. –  UncleO Jun 13 '09 at 5:08
Yeah. That's probably right. I think in the Core Duo Intels, a division is something like 15-17 cycles. I see a lot of people try to avoid branching nowadays. But with a mod the branch is probably worthwhile. –  Nosredna Jun 13 '09 at 5:15
It's my understanding that the idea behind avoiding branches is to prevent stalling the pipeline. But performing two mods might stall the pipeline anyway; the second mod operation needs to wait for the result from the first. –  UncleO Jun 13 '09 at 5:22
The if() will almost certainly be faster than the second mod; any decent optimizing compiler can turn the if() into a cmov (conditional move) instruction, which will do the same thing without branching. –  Adam Rosenfield Jun 13 '09 at 15:12

In C and Objective-C, the division and modulus operators perform truncation towards zero. a / b is floor(a / b) if a / b > 0, otherwise it is ceiling(a / b) if a / b < 0. It is always the case that a == (a / b) * b + (a % b), unless of course b is 0. As a consequence, positive % positive == positive, positive % negative == positive, negative % positive == negative, and negative % negative == negative (you can work out the logic for all 4 cases, although it's a little tricky).

share|improve this answer
+1 for the why. –  Matt B. May 27 '10 at 0:15

If n has a limited range, then you can get the result you want simply by adding a known constant multiple of 3 that is greater that the absolute value of the minimum.

For example, if n is limited to -1000..2000, then you can use the expression:

result = (n+1002) % 3;

Make sure the maximum plus your constant will not overflow when summed.

share|improve this answer

We have a problem of language:

math-er-says: i take this number plus that number mod other-number
code-er-hears: I add two numbers and then devide the result by other-number
code-er-says: what about negative numbers?
math-er-says: WHAT? fields mod other-number don't have a concept of negative numbers?
code-er-says: field what? ...
  • the math person in this conversations is talking about doing math in a circular number line. If you subtract off the bottom you wrap around to the top.
  • the code person is talking about an operator that calculates remainder.

In this case you want the mathematician's mod operator and have the remainder function at your disposal. you can convert the remainder operator into the mathematician's mod operator by checking to see if you fell of the bottom each time you do subtraction.

share|improve this answer
The natural numbers define division such that (n+d)/d==(n/d)+1. The real numbers do too. The real numbers also support -(n/d)==(-n)/d, but the natural numbers do not. It is possible for integers to support one axiom or the other, but not both. While programming language could uphold the first axiom for integers and some do, the creators of FORTRAN decided to support the second instead, and many other languages have followed suit. –  supercat Dec 20 '13 at 21:55

I would have expected a positive number, as well, but I found this, from ISO/IEC 14882:2003 : Programming languages -- C++, 5.6.4 (found in the Wikipedia article on the modulus operation):

The binary % operator yields the remainder from the division of the first expression by the second. .... If both operands are nonnegative then the remainder is nonnegative; if not, the sign of the remainder is implementation-defined

share|improve this answer

If this will be the behavior, and you know that it will be, then for m % n = r, just use r = n + r. If you're unsure of what will happen here, use then r = r % n.

Edit: To sum up, use r = ( n + ( m % n ) ) % n

share|improve this answer
If you just said he should do (-1 + 3) % 3 = 2, I agree. :-) –  Nosredna Jun 13 '09 at 4:23
I would say do ( 3 + ( -1 % 3 ) ) % 3 == (3 + (-1) ) % 3 == ( 2 % 3 ) == 2 –  maxwellb Jun 13 '09 at 4:32
Gotcha. That's good. It can be done with a conditional (if or ternary) as well. –  Nosredna Jun 13 '09 at 4:54

JavaScript does this, too. I've been caught by it a couple times. Think of it as a reflection around zero rather than a continuation.

share|improve this answer

Why: because that is the way the mod operator is specified in the C-standard (Remember that Objective-C is an extension of C). It confuses most people I know (like me) because it is surprising and you have to remember it.

As to a workaround: I would use uncleo's.

share|improve this answer

There are two choices for the remainder, and the sign depends on the language. ANSI C chooses the sign of the dividend. I would suspect this is why you see Objective-C doing so also. See the wikipedia entry as well.

share|improve this answer

Not only java script, almost all the languages shows the wrong answer' what coneybeare said is correct, when we have mode'd we have to get remainder Remainder is nothing but which remains after division and it should be a positive integer....

If you check the number line you can understand that

I also face the same issue in VB and and it made me to forcefully add extra check like if the result is a negative we have to add the divisor to the result

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.